Subsets of colossally abundant numbers

Abstract

Let G(n)=σ (n)/(n n ). Robin made hypothesis that G(n)<eγ for all integer n>5040. This article divides all colossally abundant numbers in to three disjoint subsets CA1, CA2 and CA3, and shows that Robin hypothesis is true if and only if all CA2 numbers n>5040 satisfy Robin inequality.